Inequalities for generalized trigonometric and hyperbolic sine functions

Abstract

We prove that the inequalities p,q(rs)≥ p,q(r)p,q(s) and p,q(r*s*) ≤ p,q(r*)p,q(s*) hold for all p,q∈(1,∞), r,s∈(0,∫01(1-tq)-1/pdt) and r*,s*∈(0,∫0∞(1+tq)-1/pdt), where p,q and p,q are the generalized trigonometric and hyperbolic sine functions, respectively. As a consequence of the results, we prove a conjecture due to Bhayo and Vuorinen [J. Approx. Theory, 164(2012)].